Derivations on the matrix semirings of max-plus algebra

Let $(S,\oplus,\otimes)$ be a matrix semiring of max-plus algebra with the addition operation $\oplus$ and the multiplication operation $\otimes$, where the set \( S \) consists of matrices constructed from real numbers together with the element negative infinity. A derivation on the semiring \(S\) is an additive mapping \(\delta\) from \(S\) to itself that satisfies the axiom \(\delta(x \otimes y) = (\delta(x) \otimes y) \oplus (x \otimes \delta(y))\), for every \(x, y \in S\). From $S$ we construct all of semiring derivations of $S$ are denoted by $D$. On the set $D$, we defined two binary operations, i.e., addition $\dotplus$ and composition $\circ$ . We want to investigate the structure of $D$ over $\dotplus$ and $\circ$ operations. We show that \( D \) is not a semiring, but there exists a sub-semiring \( H \) \(\subseteq\) \( D \). Here, triple $(H,\oplus,\circ)$ is a semiring which is constructed from max-plus algebra.